primary ideal
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English[edit]
Noun[edit]
primary ideal (plural primary ideals)
- (algebra, ring theory) Given a commutative ring R, any ideal I such that for any a,b ∈ R, if ab ∈ I then either b ∈ I or an ∈ I for some integer n > 0.
- 1953, D. G. Northcott, Ideal Theory, Cambridge University Press, page 10:
- The prime and primary ideals play roles which are (very roughly) similar to those played by prime numbers and by prime.power numbers in elementary arithmetic.
- 1970 [Frederick Ungar Publishing], John R. Schulenberger (translator), B. L. van der Waerden, Algebra, Volume 2, 1991, Springer, page 189,
- Thus all higher primary ideals are symbolic powers of higher prime ideals.
- Prüfer has called the ideals a with the property a* = a v-ideals. The integral v-ideals are just those in whose primary ideal decomposition only higher primary ideals occur.
- 1997, Ralf Fröberg, An Introduction to Gröbner Bases, John Wiley & Sons, page 71:
- A primary ideal has a prime ideal as radical, so its corresponding algebraic set is irreducible. Primary ideals can, however, have multiplicity, so they give a finer description of the solution set.
Hyponyms[edit]
- (ring theory): prime ideal
Translations[edit]
(ring theory)
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